Is subitizing simply canonical pattern matching

Lunken, Eugene Jonah

12 1900

No description available.

Number concept

Pattern perception

Two-digit number comparison

PANG, HYUNMO

22 September 2009

Magnitudes of numbers influence numerical inequality judgments of people. Do symbols representing numbers also affect numerical inequality judgments? To answer the question, I manipulated digit similarity in two-digit number comparison tasks. During the experiment, the participants took part in two comparison tasks – the judging-larger task and the judging-smaller task. Given pairs of two-digit numbers, the participants were required to make numerical inequality judgments (judging larger or judging smaller). To investigate the effect of digit similarity, two kinds of number pairs were used. Two-digit number pairs consisting of same-digits numbers (e.g., 21 – 12) and two-digit number pairs consisting of different-digits numbers (e.g., 21 – 30) were presented at random. The participants needed more time to compare the same-digits number pairs than the different-digits pairs. The result was independent of the findings in number comparison studies such as the numerical-distance effect (Moyer & Landauer, 1967) and the unit-decade compatibility effect (Nuerk, Weger, & Willmes, 2001). The present study poses challenge to the current theories of two-digit number comparison. / Thesis (Master, Psychology) -- Queen's University, 2009-09-02 11:59:06.647

number comparison

digit similarity

On a generalization of a theorem of Stickelberger

Rideout, Donald E. (Donald Eric)

January 1970

No description available.

Algebraic fields.

Number theory.

Low Reynolds number flow perpendicular to a circular cylinder with surface mass transfer

Wu, Han-Chuan

12 1900

No description available.

Reynolds number

Mass transfer

A study of hysteresis effects and time rate of change of Reynolds number in unsteady flow in tubes through the transition range

Sims, William Herbert

08 1900

No description available.

Reynolds number

Tubes Aerodynamics

Correlation of pressure losses in small bore tubing for Reynolds numbers between 400 and 50,000

Lattal, Gerald Leonard

08 1900

No description available.

Reynolds number

Tubes Aerodynamics

A novel approach for analyzing supersonic high reynolds number flows with separation

Power, Gregory D.

05 1900

No description available.

Reynolds number

Viscous flow

Transition to a time periodic flow in a through-flow lid-driven cavity

Benson, John D.

12 1900

No description available.

Reynolds number

Viscous flow

Factors contributing to understanding of selected basic arithmetical principles and generalizations

Stoneking, Lewis William

January 1960

There is no abstract available for this dissertation.

Arithmetic -- Foundations.

Number concept.

Curves of genus 2 with real multiplication by a square root of 5

Wilson, J.

January 1998

Our aim in this work is to produce equations for curves of genus 2 whose Jacobians have real multiplication (RM) by $\mathbb{Q}(\sqrt{5})$, and to examine the conjecture that any abelian surface with RM by $\mathbb{Q}(\sqrt{5})$ is isogenous to a simple factor of the Jacobian of a modular curve $X_0(N)$ for some $N$. To this end, we review previous work in this area, and are able to use a criterion due to Humbert in the last century to produce a family of curves of genus 2 with RM by $\mathbb{Q}(\sqrt{5})$ which parametrizes such curves which have a rational Weierstrass point. We proceed to give a calculation of the $\mbox{\ell}$-adic representations arising from abelian surfaces with RM, and use a special case of this to determine a criterion for the field of definition of RM by $\mathbb{Q}(\sqrt{5})$. We examine when a given polarized abelian surface $A$ defined over a number field $k$ with an action of an order $R$ in a real field $F$, also defined over $k$, can be made principally polarized after $k$-isogeny, and prove, in particular, that this is possible when the conductor of $R$ is odd and coprime to the degree of the given polarization. We then give an explicit description of the moduli space of curves of genus 2 with real multiplication by $\mathbb{Q}(\sqrt{5})$. From this description, we are able to generate a fund of equations for these curves, employing a method due to Mestre.

510

Number theory