Let $Y$ be a smooth complex projective curve of genus two, $X$ a Galois
cover of degree two of $Y$ and $K$ the canonical divisor of $X$.
Let $i$ be the involution of $X$ over $Y$.
Can one find a point $P$ on $X$ such that, if $Q=i(P)$, the divisor
$5P+3Q$ is linearly equivalent to $2K$?
I am receving a Warn message as follows whenever the RDD size is large.
The task completes and output is shown.
Sample Code
>>> ord_items = sc.textFile('practice/retail_db/Order_items',1)
>>> ord_items.take(60)
Output Warning
WARN BlockReaderFactory: I/O error constructing remote block reader
j...
I would like to iterate over the numbers with more than $D$ divisors in a large range $[x, x+N]$. Current values I'm working with are $D=626$ and $x\approx N\approx10^{11}.$
At the moment I'm using a factorization sieve (PARI/GP's forfactored) to iterate through the whole interval and skipping an...
Let $Y$ be a smooth complex projective curve of genus two, $X$ a Galois
cover of degree two of $Y$ and $K$ the canonical divisor of $X$.
Let $i$ be the involution of $X$ over $Y$.
Can one find a point $P$ on $X$ such that, if $Q=i(P)$, the divisor
$5P+3Q$ is linearly equivalent to $2K$?
I am receving a Warn message as follows whenever the RDD size is large.
The task completes and output is shown.
Sample Code
>>> ord_items = sc.textFile('practice/retail_db/Order_items',1)
>>> ord_items.take(60)
Output Warning
WARN BlockReaderFactory: I/O error constructing remote block reader
j...
