matt stokes's user avatar
matt stokes's user avatar
matt stokes's user avatar
matt stokes
  • Member for 7 years
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7 votes
Accepted

Relation between Minimum number of generator and number of elements?

4 votes
Accepted

Is the additive group of rationals quotiented out by the integers isomorphic to the additive group of rationals?

4 votes

Maximum value of increasing function over interval

3 votes

the kernel of the evaluation map

3 votes
Accepted

Understanding Proof of Euler's Theorem

2 votes

Showing that the alternating group of degree n is normal

2 votes

Symmetry Groups

2 votes

Prove $\forall x,y \in \mathbb{R} :\lfloor{x+y}\rfloor=\lfloor{x}\rfloor+\lfloor{y}\rfloor∨\lfloor{x+y}\rfloor=\lfloor{x}\rfloor+\lfloor{y}\rfloor+1$

1 vote
Accepted

Prove that $|\mathcal{F}|=|\mathbb{R}|$.

1 vote

Kernel of $GL(n, \mathbb{Z}) \to GL(n, \mathbb{Z}_{m})$

1 vote
Accepted

Local properties to Global properties of compact spaces

1 vote

Finding a Field in Which a Function Splits into Linear Factors

1 vote

A question on Ray class groups and the relative degree of a prime

1 vote

Question about the prime factorization of Jacobi sums in $\mathbb{Q}(\zeta_m)$.

1 vote

Proving two subgroups with same cardinality are identical if one is normal

1 vote

Let $K/F$ be a function field of genus $g\geq 2$, and $\deg(P)=1$. If $0\leq k\leq 2g - 2$ show there are $g$ values of $k$ s.t $l(kP) = l((k+1)P)$.

0 votes
Accepted

Find the least non residue

0 votes

How do you find cardinality of the set of functions $A\to A$? How to take the first step to approach this?

0 votes

$a_{n + 1} = 5 - \frac{6}{a_n + 2}$ with $a_1 = 1$ . Prove by induction that $a_n < 4$ for $n \geq 1$.

0 votes

Finding a Basis for a Topology

0 votes

Example of sequence of function that monotone bounded but not uniformly convergent