# Properties

 Base field $$\Q(\sqrt{-11})$$ Weight 2 Level norm 2916 Level $$\left(54\right)$$ Label 2.0.11.1-2916.4-f Dimension 1 CM no Base-change yes Sign +1 Analytic rank $$0$$

# Related objects

## Base field: $$\Q(\sqrt{-11})$$

Generator $$a$$, with minimal polynomial $$x^2 - x + 3$$; class number $$1$$.

## Form

 Weight 2 Level 2916.4 = $$\left(54\right)$$ Label 2.0.11.1-2916.4-f Dimension: 1 CM: no Base change: yes 6534.2.a.bc , 54.2.a.a Newspace: 2.0.11.1-2916.4 (dimension 8) Sign of functional equation: +1 Analytic rank: $$0$$ L-ratio: 1

## Atkin-Lehner eigenvalues

Norm Prime Eigenvalue
$$4$$ 4.1 = ($$2$$) $$-1$$
$$3$$ 3.1 = ($$-a$$) $$-1$$
$$3$$ 3.2 = ($$a - 1$$) $$-1$$

## Hecke eigenvalues

The Hecke eigenvalue field is $\Q$. The eigenvalue of the Hecke operator $T_{\mathfrak{p}}$ is $a_{\mathfrak{p}}$. The database contains 200 eigenvalues of which we only show 50. We only show the eigenvalues $a_{\mathfrak{p}}$ for primes $\mathfrak{p}$ which do not divide the level.

$N(\mathfrak{p})$ $\mathfrak{p}$ $a_{\mathfrak{p}}$
$$5$$ 5.1 = ($$-a - 1$$) $$3$$
$$5$$ 5.2 = ($$a - 2$$) $$3$$
$$11$$ 11.1 = ($$-2 a + 1$$) $$-3$$
$$23$$ 23.1 = ($$a + 4$$) $$-6$$
$$23$$ 23.2 = ($$a - 5$$) $$-6$$
$$31$$ 31.1 = ($$-3 a + 4$$) $$5$$
$$31$$ 31.2 = ($$3 a + 1$$) $$5$$
$$37$$ 37.1 = ($$-3 a - 2$$) $$2$$
$$37$$ 37.2 = ($$3 a - 5$$) $$2$$
$$47$$ 47.1 = ($$-2 a + 7$$) $$6$$
$$47$$ 47.2 = ($$2 a + 5$$) $$6$$
$$49$$ 49.1 = ($$7$$) $$-13$$
$$53$$ 53.1 = ($$-4 a + 5$$) $$9$$
$$53$$ 53.2 = ($$4 a + 1$$) $$9$$
$$59$$ 59.1 = ($$a + 7$$) $$12$$
$$59$$ 59.2 = ($$a - 8$$) $$12$$
$$67$$ 67.1 = ($$-3 a - 5$$) $$14$$
$$67$$ 67.2 = ($$3 a - 8$$) $$14$$
$$71$$ 71.1 = ($$-5 a + 1$$) $$0$$
$$71$$ 71.2 = ($$5 a - 4$$) $$0$$
$$89$$ 89.1 = ($$5 a + 2$$) $$-18$$
$$89$$ 89.2 = ($$5 a - 7$$) $$-18$$
$$97$$ 97.1 = ($$-3 a + 10$$) $$-1$$
$$97$$ 97.2 = ($$3 a + 7$$) $$-1$$
$$103$$ 103.1 = ($$-6 a + 1$$) $$-4$$
$$103$$ 103.2 = ($$6 a - 5$$) $$-4$$
$$113$$ 113.1 = ($$a + 10$$) $$-6$$
$$113$$ 113.2 = ($$a - 11$$) $$-6$$
$$137$$ 137.1 = ($$7 a - 5$$) $$6$$
$$137$$ 137.2 = ($$7 a - 2$$) $$6$$
$$157$$ 157.1 = ($$-3 a + 13$$) $$-4$$
$$157$$ 157.2 = ($$3 a + 10$$) $$-4$$
$$163$$ 163.1 = ($$-6 a - 5$$) $$20$$
$$163$$ 163.2 = ($$6 a - 11$$) $$20$$
$$169$$ 169.1 = ($$13$$) $$-10$$
$$179$$ 179.1 = ($$-5 a + 13$$) $$-9$$
$$179$$ 179.2 = ($$-5 a - 8$$) $$-9$$
$$181$$ 181.1 = ($$-3 a - 11$$) $$-16$$
$$181$$ 181.2 = ($$3 a - 14$$) $$-16$$
$$191$$ 191.1 = ($$-7 a + 11$$) $$-12$$
$$191$$ 191.2 = ($$-7 a - 4$$) $$-12$$
$$199$$ 199.1 = ($$-6 a + 13$$) $$-7$$
$$199$$ 199.2 = ($$6 a + 7$$) $$-7$$
$$223$$ 223.1 = ($$-9 a + 5$$) $$8$$
$$223$$ 223.2 = ($$-9 a + 4$$) $$8$$
$$229$$ 229.1 = ($$9 a - 7$$) $$14$$
$$229$$ 229.2 = ($$9 a - 2$$) $$14$$
$$251$$ 251.1 = ($$-5 a + 16$$) $$0$$
$$251$$ 251.2 = ($$5 a + 11$$) $$0$$
$$257$$ 257.1 = ($$-8 a - 5$$) $$12$$