Questions on (ordinary) differential equations. For questions specifically concerning partial differential equations, use the (pde) tag.

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1answer
8 views

Linear independence and Wronskian - Proof or Counterexample

If $y_1(x) , y_2(x) ,\ldots,y_n(x)$ are linearly independent in $C[b,c]$ then they are Linearly Independent in $C[a,d]$, where $a<b<c<d.$ So I know if the Wronskian isn't zero for at least ...
0
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0answers
6 views

Multiple eigenvalue solutions problem

In a problem regarding multiple eigenvalue solutions (defective eigenvalues, complete eigenvalues, the like) I have a 4x4 matrix with one complete eigenvalue, and another incomplete eigenvalue with a ...
-2
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0answers
8 views

Fundamental solutions for pde [on hold]

I am looking for fundamental solution for the following PDE problem. $$2xy(u_{xx} + u_{yy}) + yu_{x} + xu_{y} =0$$ Any help will be appreciated. Thnak you.
0
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0answers
26 views

Solving a delay differential equation

Is it possible to solve differential equations with composite functions, e.g. $f^{(n)}\circ (x-1)$ and $f^{(n)}\circ(x)$. I'm particularly interested in $$2f'(x-1)+(x-1)f''(x-1)-f''(x)=g(x).$$ Do ...
0
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1answer
27 views

Show there are infinitely many distinct maximal solutions of $\frac{dx}{dt} = (3/2)x^{1/3}$ that pass through the point $(t_0,0)$

$$\frac{dx}{dt} = (3/2)x^{1/3}$$ Solve Show that given any point $(t_0,0)$ on the $t$-axis, there are infinitely many distinct maximal solutions that pass through the point. We are given: ...
1
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1answer
27 views

Maximal interval of solutions existence: $x'(t)=-x(t)+\sin x(t)+t^3$

$x'(t)=-x(t)+ \sin x(t)+t^3$ in $\mathbb{R}$ I consider the function: $$ f(t,x)=-x+\sin x + t^3 $$ $$\frac{\partial f}{\partial x}=\cos x-1$$ I see that: $$\left| \frac{\partial f}{\partial x} ...
1
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0answers
39 views

Differential equation including Dirac Delta function

I am trying to understand Dirac delta function. Here is a DE to solve: $f''(x) - 3f'(x) +2f(x)=k\delta(x-a)$ with intial conditions $ f(0)=f'(0)=1$ where $ k \in \mathbb{R}$ is constant. I know this ...
2
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1answer
24 views

Jump Diffusion Infinitesimal generator

I have this difussion process $dX(t)=\mu X(t)dt+\sigma X(t)dW(t)+u X(t) dN(t),\qquad X(0)=x > 0$ where $W(t)$ is a Brownian Motion and $N(t)$ is a Poisson process. And I need to know the ...
0
votes
1answer
26 views

Find the population from a model

$$\frac{dp}{dt} = \frac{2p(7-p)}{700}$$ Given $p(0) = 3$ and $p \gt 0$, find $p(57)$. I'm able to separate the variables and get $$\frac{700}{(2p)(7-p)} = dt$$ I then separate to different bases. ...
2
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2answers
131 views

Relationship between the diffusion equation and the heat equation

In physics we have the heat equation which describes the propagation of heat $$\dfrac{\partial u}{\partial t} = \kappa \dfrac{\partial^2 u}{\partial x^2},$$ while in biomathematics we have the ...
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0answers
33 views

Find Population from Model

First time I asked this it didn't get entered correctly so got wrong answers, which helped explain a different question I had. $$\frac{dp}{dt} = \frac{2p(7-p)}{700}$$ Given $p(0) = 3$ and $p \gt ...
2
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0answers
42 views

Solution of $x'=Ax$ is not what it is supposed to be

Consider a system of ODEs $x'=\begin{bmatrix} 0 &1 \\ -1&0 \end{bmatrix}x$. Wolfram Alpha says that the solution is $x(t) = \begin{bmatrix} \cos t &\sin t \\ -\sin t& \cos t ...
2
votes
2answers
55 views

Differential equation $y' + yx - 2 = 0$

I'd like to see different methods to solve the differential equation $$y' + yx - 2 = 0.$$ Thank you in advance. Update Since the question has been put on hold as if it misses context I think it best ...
1
vote
1answer
14 views

Definition of trajectory

I am writing something that involves comparing the solutions of many different differential equations, and I need precise definitions of the terms trajectory and solution curve. Given a dynamical ...
0
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2answers
21 views

Canonical form and fundamental solution of pdf

Can someone help with these two PDE problems? Thank you. Reduce to Canonical form and find the fundamental solution if possible. $$y^2u_{xx} + x^2u_{yy} = 0.$$ What type of transformation should I ...
0
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0answers
38 views
+150

Solving a general Bernoulli diferential equation.

So this is the equation. $a,b,N_0 \in \mathbb{R}, ab>0$ $$N'(x)= aN(x)-bN(x)^2, (x\in[0,\infty)), N(0) = N_0$$ First things first $\color{red}I $ need to transform this, If we let $N = w^{1/2}$, ...
1
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3answers
51 views

Trigonometric identities from differential equation

If one knows that the solutions of $y''+ y=0$ are two functions $s(x)$ and $c(x)$, and we know that $s(0)=0$, $s'(0)=1$, $c(0)=1$, $c'(0)=0$, then how can one start to prove that ...
0
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2answers
29 views

Solving this differential equation via dividing by $t^n$

I have this differential equation that I need to solve: $y'=\frac{(x^2-y^2)}{3xy}$ My teacher gave a hint to divide everything on the right hand side by $t^n$, but I do not see how this is helpful. ...
1
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2answers
30 views

Solution Set of System of ODE.

I am trying to find the solution of the system $$\begin{bmatrix}x_1\\x_2\end{bmatrix}'= \begin{bmatrix}1&3\\3&1\end{bmatrix}\begin{bmatrix}x_1\\x_2\end{bmatrix}$$. I am given that ...
0
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1answer
15 views

Question about a solution of a partial differential equation by separation of variables

I'm trying to understand this text: http://www.ekayasolutions.com/UCDMath/HeatCondSphere.pdf But I'm having problem with this part: Whe have to solve: \begin{equation} \dfrac{\partial ...
2
votes
1answer
28 views

ODE problem with a single function but two arguments

I have been trying to solve the following ODE with no success: $$ \frac{df(x)}{dx} = -x f(x) + 4xf(2x)$$ I even tried using Maple but it seems to only accept ODE's that are function of the same ...
0
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2answers
38 views

Seperation of variables is not rigorous enough.

So I have started ODE's and have been told that solving initial value problems by using separation of variables(like I had been taught) is nothing but a leap of faith. Now we must use something along ...
2
votes
1answer
18 views

Turing criteria for Sel'kvo glycolysis model

I have the Sel'kov reaction diffusion model for glycolysis as follows: \begin{eqnarray} u_t=D_uu_{xx}-u+av+u^2v\\ v_t=D_vv_{xx}+b-av-u^2v \end{eqnarray} How can I obtain the values for $D_u$ and ...
0
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1answer
18 views

Ex ODE: $y'=4t \sqrt y- \lambda(y-(1+t^2)^2)$

How to solve the following equation? $y'=4t \sqrt y- \lambda(y-(1+t^2)^2)$ $y(0)=a$ Show those cases where a numerical method will solve this equation exactly. $(a,\lambda) \in {\Re}^2$
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2answers
25 views

Explicit Euler Method's Order

I am seeing everywhere that the order of the Explicit Euler Method is 2 but I can't prove it on my own. The textbook that I found the method says that the proof is very easy so it is up to the reader ...
2
votes
1answer
60 views

Doomsday Prediction

I have a calculus problem I can't seem to figure out. Any help would be appreciated! Doomsday prediction. In $1960$, three electrical engineers at the University of Illinois published a paper in ...
1
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0answers
26 views

How to calculate inverse laplace of $e^{a\sqrt s}$?

I was using Laplace to find solutions for $$\frac{\partial u}{\partial t}=\frac{\partial^2 u}{\partial x^2}$$ with boundary conditions $$u(0,t)=1 \\ u(1,t)=1 \\ u(x,0)=1+ \sin \pi x$$ I used ...
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0answers
12 views

Galerkin method in Sobolev space

I've got this problem to solve: Using Galerkin method, prove that there exists a weak solution of this differential equation: $$-\Delta u = a(x) \circ \triangledown u - u_t +f(x)$$ on $\Omega$ $$u ...
0
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1answer
32 views

How to use the 3rd and 4th boundary conditions in this?

I was solving $$ \frac{\partial^2 u}{\partial t^2}=\frac{\partial^2 u}{\partial x^2}$$ All the boundary conditions are as follows:- $$u(0,t)=0 \\ u(\pi ,t)=0 \\ u(x,0)=\sin x \\ u_t(x,0)=x^2$$ ...
0
votes
1answer
26 views

Separable solution to a nonlinear parabolic PDE

I seek a separable solution to the nonlinear parabolic partial differential equation, $\frac{\partial u}{\partial t} = u \frac{\partial u}{\partial x^2} + u^2.$ The physics of the problem allow ...
-1
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0answers
19 views

Stability of gradient flow $x'(t) = -\nabla E(x)$, $E(x)$ is convex function. [on hold]

Let $E: R^d \to R$ be convex and continously differentiable. The IVP $x'(t) = -\nabla E(x), x(0) = x_0, t>0$ is called the gradient flow. Show that gradient flow has following properties a) ...
8
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0answers
35 views

Eigenvalue problem for $−\psi''(x) − (ix)^ N \psi(x) = E\psi(x)$ in complex plane

To find the eigenvalue $E$ in the complex plane of $x$ for one dimensional Schrodinger equation $$ −\psi''(x) − (ix)^ N \psi(x) = E\psi(x). $$ where $N$ can be any real number, the boundary condition ...
1
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4answers
64 views

Why cannot $A\sin\alpha x +B\cos \alpha x$ be zero?

I was going through solving wave equations using fourier and I came across a note saying $A\sin\alpha x +B\cos \alpha x \neq 0$ I believe this applies to $\alpha ,A,B\neq 0$ I was solving $$ ...
0
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1answer
19 views

How to find isoclines of the following system?

If I had a system of equations such as: $$\dot{x}=(1+2x+y)x$$ $$\dot{y}=(4+6x+2y)y$$ How would I find the horizontal and vertical isoclines of such a system? I know ...
3
votes
1answer
36 views

Evolution semigroups for differential equations

I would like to ask whether "evolution semigroups" are really useful (to discover something that can't be discovered in some other way?). There is a huge machinery to deal with them, but from my point ...
3
votes
1answer
47 views

Differential equation where Picard-Lindelöf can not be applied

My question is the following : Let $f:\mathbb{R}\to\mathbb{R}$ be continuous function and let $u:[a,b]\to\mathbb{R}$ be a $C^1$ function such that $$\forall t\in[a,b],u'(t)=f(u(t))\text{ and ...
2
votes
2answers
86 views

Particular solution of an ODE

How do I show that a particular solution $y_{1}$ of the ODE $$y''-k^{2}y=R(x)$$ $k\neq0$, is given by $$y_{1}=\frac{1}{k}\int_{0}^{x}R(t)\sinh(k(x-t))dt$$ I really have no idea how to do it.
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2answers
18 views

If $g(t)=d$ (constant), show that all solution of $L[y] \to \frac{d}{c}$ when $t \to \infty$

Let the differential equation $L[y] = a y'' + by' + cy = g(t)$, where $a$, $b$ and $c$ are strictly positive numbers. If $g(t)=d$ (constant), show that all solution of $L[y] \to \frac{d}{c}$ when $t ...
0
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1answer
16 views

Show that $Y_1[t]- Y_2[t] \to 0$ as long as $t \to \infty$ - Differential equations

Let the differential equation $L[y] = a y'' + by' + cy = g(t)$, where $a$, $b$ and $c$ are strictly positive numbers. If $Y_1(t)$ and $Y_2(t)$ are solutions at the $L[y]$ equation, show that $Y_1[t]- ...
1
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0answers
12 views

Searching for second singular solution of a differential equation

I was given the following equation $\frac{dy}{dx}=\sqrt{y-4}$ and was asked to solve it and find a family of solutions. I've solved the equation so that $y=\frac{x^2+16}{4}+c$ or ...
1
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2answers
49 views
+50

What exactly is the maximal solution of an ODE and why do we care?

I am reading these notes on the definition of a maximal solution of an ODE i.e. http://www.math.lmu.de/~philip/publications/lectureNotes/ODE.pdf But the definition is so abstract and no example is ...
2
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3answers
33 views

Differential equations (second edition) - William E. Boyce & Richard C. Diprima (#$31$, page $142$)

In many physical problems, non-homogeneous term may differ from one time interval to another. By example, determine the solution $y = \phi(t)$ at $$y'' + y = \begin{cases} t ...
0
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1answer
15 views

Finite Difference Equation with Constant Co-efficient

I trying to find tutorials on the topic (Finite Difference Equation with Constant Co-efficient) but I can't get exactly what I want. The said Difference Equation has a ...
0
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1answer
18 views

Parameters for existence of Solutions for Inhomogeneous BVP Equation.

I've been studying the Fredholm Alternative recently and have become stuck on a couple of questions. What values of $A$ and $B$ will give a solution for the following BVPs? I know that $Q_1$ is ...
1
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1answer
44 views

$x'=\cos^5(x) +1$ has unique solution defined for all $t\in \mathbb{R}$

I would appreciate if someone could please give me a hint on how to do this problem. Or where to see some examples. Unfortunately, the sources that I have do not seem to actually explain it and show ...
0
votes
1answer
21 views

Find $c, M > 0$ such that $\lvert e^{tA}x_0\lvert \le Me^{ct}\lvert x_0\lvert$

In a system of differential equations $x'=Ax$, where $A$ is a constant matrix, and the equation is a sink (all eigenvalues of $A$ have negative real parts), I need to find constants $c,M>0$ such ...
1
vote
1answer
20 views

Stable eigenspace of $x'=Ax$

Given the system $\bf{x'}=Ax$, where $\bf{A}$$=\begin{bmatrix} -2 &0 &0 \\ 2& 1 & 0\\ 0 &0 &1 \end{bmatrix}$, the solution is $x(t) = \begin{bmatrix} e^{-2t} & 0 ...
0
votes
0answers
22 views

$\bf{x'}=Ax$ with eigenvalues of multiplicity greater than $1$

Given the system $\bf{x'}=Ax$, where $\bf{A}$$=\begin{bmatrix} -2 &0 &0 \\ 2& 1 & 0\\ 0 &0 &1 \end{bmatrix}$, if I solve it by first finding matrix $\bf{P}$ and then ...
2
votes
1answer
34 views

Finding Fourier series constant and integral

I have been studying Griffith's Intro to Electrodynamics. I am studying differential equations and Fourier series. I am studying the problem discussed here: Why is this allowed? ("Fourier's ...
0
votes
2answers
54 views

How to solve the Sturm Liouville problem $y''-3y'+λy=0$, $y'(0)=0$, $y'(\pi)=0$?

Hi everybody I need to find the values of λ>0 and λ<0 to find the own values, I knowk that in the case λ=0 I obtain the trivial solution, but in the other cases I don`t know what to do, any help ...