Quantum Optics Toolbox User`s Guide
... the manipulation of complex valued matrices as primitive data objects. This is particularly convenient for representing quantum mechanical operators taken with respect to some basis. We shall see that the sparse matrix facilities built into the Matlab language allow e¢cient computation with these qu ...
... the manipulation of complex valued matrices as primitive data objects. This is particularly convenient for representing quantum mechanical operators taken with respect to some basis. We shall see that the sparse matrix facilities built into the Matlab language allow e¢cient computation with these qu ...
Full text
... We leave it to the reader to see how the graphs of partitions of n can be constructed directly from that of the basis. As an exercise, he/she might also find a formula for the number of self-conjugate partitions of n. As a corollary to the theorem of this section, we have CofiolZa/iy: The number of ...
... We leave it to the reader to see how the graphs of partitions of n can be constructed directly from that of the basis. As an exercise, he/she might also find a formula for the number of self-conjugate partitions of n. As a corollary to the theorem of this section, we have CofiolZa/iy: The number of ...
scientific notation help
... Scientific notation is the way that scientists easily handle very large numbers or very small numbers. For example, instead of writing 0.0000000056, we write 5.6 x 10-9. So, how does this work? We can think of 5.6 x 10-9 as the product of two numbers: 5.6 (the digit term) and 10-9 (the exponential t ...
... Scientific notation is the way that scientists easily handle very large numbers or very small numbers. For example, instead of writing 0.0000000056, we write 5.6 x 10-9. So, how does this work? We can think of 5.6 x 10-9 as the product of two numbers: 5.6 (the digit term) and 10-9 (the exponential t ...
Lecture Note
... or more solutions. In this section we discuss a numerical procedure which allows us to compute the solution of a one variable equation very quickly to any precision we like. It is called the Newton-Raphson method. It is based on the following idea. Suppose we have an equation of the form f (x) = 0, ...
... or more solutions. In this section we discuss a numerical procedure which allows us to compute the solution of a one variable equation very quickly to any precision we like. It is called the Newton-Raphson method. It is based on the following idea. Suppose we have an equation of the form f (x) = 0, ...
Powers of Ten & Significant Figures
... decimal point [even if there is nothing after it] Example: 210 and 210000 both have two significant figures, while 210. has three and 210.00 has five the difference is in how accurately they were measured… 210 is accurate to only the “tens” place 210. is accurate to the “ones” place ...
... decimal point [even if there is nothing after it] Example: 210 and 210000 both have two significant figures, while 210. has three and 210.00 has five the difference is in how accurately they were measured… 210 is accurate to only the “tens” place 210. is accurate to the “ones” place ...
