N2 - The convolution operation used in deterministic network calculus differs from its counterpart known from the
classic systems theory. A reason for this lies in the fact that the former is defined in terms of the so-called min-plus algebra.
Therefore, it is oft difficult to realize how it really works. In these cases, its graphical interpretation can be very helpful. This paper
is devoted to a topic of construction of the min-plus convolution curve. This is done here in a systematic way to avoid arriving at
non-transparent figures that are presented in publications. Contrary to this, our procedure is very transparent and removes
shortcomings of constructions known in the literature. Some examples illustrate its usefulness.
JO - International Journal of Electronics and Telecommunications
L1 - http://rhis.czasopisma.pan.pl/Content/103854/PDF/32_1248-4319-1-PB.pdf
L2 - http://rhis.czasopisma.pan.pl/Content/103854
IS - No 2
KW - convolution
KW - network calculus
KW - min-plus algebra
KW - graphical construction of min-plus convolution
ER -
A1 - Borys, Andrzej
PB - Polish Academy of Sciences Committee of Electronics and Telecommunications
VL - vol. 64
JF - International Journal of Electronics and Telecommunications
T1 - Detailed Consideration of Graphical Calculation of Min-Plus Convolution in Deterministic Network Calculus
UR - http://rhis.czasopisma.pan.pl/dlibra/docmetadata?id=103854
DOI - 10.24425/119373