Qadics

qadic_field(p::Integer, d::Int, var::String = "a"; precision::Int=64, cached::Bool=true, check::Bool=true)
qadic_field(p::ZZRingElem, d::Int, var::String = "a"; precision::Int=64, cached::Bool=true, check::Bool=true)

Return an unramified extension $K$ of degree $d$ of a $p$-adic field for the given prime $p$. The generator of $K$ is printed as var.

The default absolute precision of elements of $K$ may be set with precision.

See also unramified_extension.

unramified_extension(Qp::PadicField, d::Int, var::String = "a"; precision::Int=64, cached::Bool=true)

Return an unramified extension $K$ of degree $d$ of the given $p$-adic field Qp. The generator of $K$ is printed as var.

The default absolute precision of elements of $K$ may be set with precision.

O(R::QadicField, m::Integer)

Construct the value $0 + O(p^n)$ given $m = p^n$. An exception results if $m$ is not found to be a power of p = prime(R).

O(R::QadicField, m::ZZRingElem)

Construct the value $0 + O(p^n)$ given $m = p^n$. An exception results if $m$ is not found to be a power of p = prime(R).

O(R::QadicField, m::QQFieldElem)

Construct the value $0 + O(p^n)$ given $m = p^n$. An exception results if $m$ is not found to be a power of p = prime(R).

prime(R::QadicField)

Return the prime $p$ for the given $q$-adic field.

precision(a::QadicFieldElem)

Return the precision of the given $q$-adic field element, i.e. if the element is known to $O(p^n)$ this function will return $n$.

valuation(a::QadicFieldElem)

Return the valuation of the given $q$-adic field element, i.e. if the given element is divisible by $p^n$ but not a higher power of $q$ then the function will return $n$.

lift(R::QQPolyRing, a::QadicFieldElem)

Return a lift of the given $q$-adic field element to $\mathbb{Q}[x]$.

lift(R::ZZPolyRing, a::QadicFieldElem)

Return a lift of the given $q$-adic field element to $\mathbb{Z}[x]$ if possible.

Base.sqrt(f::PolyRingElem{T}; check::Bool=true) where T <: RingElement

Return the square root of $f$. By default the function checks the input is square and raises an exception if not. If check=false this check is omitted.

Base.sqrt(a::FracElem{T}; check::Bool=true) where T <: RingElem

Return the square root of $a$. By default the function will throw an exception if the input is not square. If check=false this test is omitted.

sqrt(a::FieldElem)

Return the square root of the element a. By default the function will throw an exception if the input is not square. If check=false this test is omitted.

sqrt(a::Generic.PuiseuxSeriesElem{T}; check::Bool=true) where T <: RingElement

Return the square root of the given Puiseux series $a$. By default the function will throw an exception if the input is not square. If check=false this test is omitted.

exp(a::QadicFieldElem)

Return the $p$-adic exponential of $a$, assuming the $p$-adic exponential function converges at $a$.

log(a::QadicFieldElem)

Return the $p$-adic logarithm of $a$, assuming the $p$-adic logarithm converges at $a$.

teichmuller(a::QadicFieldElem)

Return the Teichmuller lift of the $q$-adic value $a$. We require the valuation of $a$ to be non-negative. The precision of the output will be the same as the precision of the input. For convenience, if $a$ is congruent to zero modulo $q$ we return zero. If the input is not valid an exception is thrown.

frobenius(a::QadicFieldElem, e::Int = 1)

Return the image of the $e$-th power of Frobenius on the $q$-adic value $a$. The precision of the output will be the same as the precision of the input.