kronecker delta การใช้

• The normalization is usually chosen ( using the Kronecker delta ) as
• Where " ? " here refers to the Kronecker delta.
• The Kronecker delta forms the multiplicative identity element of an incidence algebra.
• Using Kronecker delta notation, the matrix entries can be written
• Where \ delta _ k is the Kronecker delta function.
• Sometimes the Kronecker delta is called the substitution tensor.
• Since, the Kronecker delta function, it follows that
• Where \ delta stands for the Kronecker delta.
• The Kronecker delta is also called degree of mapping of one surface into another.
• Where is the Kronecker delta function and the are the Gauss Chebyshev zeros of:
• Since the partial derivative of a coordinate is the Kronecker delta, we get:
• :I don't think the Kronecker delta is a tensor at all.
• Under certain conditions, the Kronecker delta can arise from sampling a Dirac delta function.
• The \ delta symbols are Kronecker deltas.
• Where ? " i k " is the Kronecker delta or identity matrix.
• Where ? is the Kronecker delta.
• Throughout, " ? ij " is the Kronecker delta, the components of the identity matrix.
• Where \ delta ( n ) is the Kronecker delta or the identity system in the discrete-time case.
• He called it the " delta function " since he used it as a continuous analogue of the discrete Kronecker delta.
• Its discrete analog is the Kronecker delta function which is usually defined on a finite domain and takes values 0 and 1.