Figure 1. Illustrative SEM images of some microchannels and sketch of the cavity and zigzag disruptors arrangements: (a) SEM image of cavity microchannel ($ \times 30 $); (b) SEM image of zigzag microchannel ($ \times 35 $); (c) SEM image of CFL disruptor with the largest penetration length ($ \times 250 $); (d) SEM image of CFL disruptor with the smallest penetration length ($ \times 400 $); (e) top view sketches of the used zigzag and cavity microchannel arrangements and corresponding dimensions ($ {D}_0 $ – disruptor diameter; $ W $ – microchannel width; $ {L}_e $ – distance between disruptors; $ {x}_{\mathrm{disr}} $ – disruptor penetration length. Note – Visual inspection of magnified images acquired both with an optical microscope (objective ×40) and SEM (up to ×500) allowed for the assessment of the good quality of the microchannels (walls smoothness and good definition and perpendicular level of the walls).

Table 1. Actual height and width (assessed from SEM images) of the manufactured microchannels. Dimensions are defined in Figure 1 (e). R: reference microchannel (no disruptors); Ci: cavity-flow type; Zi: zigzag-flow type.

Figure 2. Effect of aging on the viscosity of blood of different animals [⋄ 3 hours after collecting blood; □ 10 hours after collecting blood; △ 24 hours after collecting blood; $ \times $ 48 hours after collecting blood; $ \ast $ 3 days after collecting blood; ∘ 7 days after collecting blood; $ + $ 15 days after collecting blood]: (a) horse blood ($ {H}_t\approx $40%, at 25 °C); (b) dog blood ($ {H}_t\approx $46%, at 25 °C).

Figure 3. Thickness of CFL as function of the volumetric flowrate and blockage ratio (non-dimensional degree of the disruptor penetration into the flow). (a,b) Horse and dog blood flows [□ microchannel R (free of CFL disruptors); △ zigzag-flow type microchannel Z1; ▲ cavity-flow type microchannel C1]; CFL measured at the wall region opposing the 1st disruptor in microchannels Z1 and C1; (c,d) CFL thickness after some disruptors for horse and dog blood flows in microchannel Z1; CFL measured [□ right above 13th disruptor; ■ right above 14th disruptor; △ wall opposite to the 13th disruptor; ▲ wall opposite to the 14th disruptor]; (e) Thickness of CFL at the wall opposing the disruptor as function of the blockage ratio for horse blood flows in zigzag-flow type microchannels Z1, Z4 and Z5 [⋄ 10 $ \mu \mathrm{l}/\min $, 1st disruptor; 10 $ \mu \mathrm{l}/\min $, 2nd disruptor; 10 $ \mu \mathrm{l}/\min $, 14th disruptor; △ 25 $ \mu \mathrm{l}/\min $, 1st disruptor; ▲ 25 $ \mu \mathrm{l}/\min $, 2nd disruptor; ▲ 25 $ \mu \mathrm{l}/\min $, 14th disruptor]; (f) Thickness of CFL at the wall opposing the disruptor as function of the blockage ratio for dog blood flows in cavity-flow type microchannels C1, C4 and C5 [∘ 10 $ \mu \mathrm{l}/\min $, 1st disruptor; • 10 $ \mu \mathrm{l}/\min $, 5th disruptor; □ 25 $ \mu \mathrm{l}/\min $, 1st disruptor; ■ 25 $ \mu \mathrm{l}/\min $, 5th disruptor].Note – For the cavity arrangements, CFL exhibited a non-linear increase of its thickness with the flowrate at the downstream disruptors region.

Figure 4. Illustration, for a blood flow around a disruptor with its penetration length into the flow $ {x}_{\mathrm{disr}} $ larger than its radius $ {D}_0/2 $, of the large residence time of a RBC inside the CFL upstream and close to the disruptor edge (highlighted with a circle marker) in comparison with that of another RBC at the plasma/erythrocytes interface (highlighted with a square marker). Flow images at that region for different instants: (a) t = 0 s; (b) t = 0.01 s; (c) t = 0.02 s; (d) t = 0.03 s; (e) t = 0.04 s; (f) t = 0.26 s.Note – These images, extracted from hundreds of the sequential images acquired with a frame rate of 2000 fps (0.5 ms between consecutive frames), exhibit a partial top view of a disruptor with the flow coming from the top to the bottom of each image. There was no experimental evidence of a similar phenomenon for blood flow around disruptors with penetration lengths $ {x}_{\mathrm{disr}} $ smaller than or equal to their radius $ {D}_0/2 $.